广义系统具有正定解的Lyapunov方程

本文研究线性广义系统有正定解的Lyapunov方程，给出广义系统稳定等价于Lyapunov方程有正定解，进一步研究了广义系统R－能观，稳定和Lyapunov方程存在正定解三者之间的关系。基于该Lyapunov方程，给出广义系统允许（正则，稳定，无脉冲）的等价条件。     

一类线性不确定组合系统的输出反馈分散输出跟踪控制

讨论了线性不确定组合系统的鲁棒分散输出渐近跟踪问题.基于Lyapunov方程正定解的存在性,给出了输出反馈跟踪控制器的设计方法.对于系统中所有允许的不确定性,所设计的控制器均使系统的输出渐近跟踪所给定的参考信号,同时系统的状态保持有界.     

一类广义非线性系统的无源控制

考虑一类广义非线性系统的无源控制问题，利用广义Lyapunov函数和线性矩阵不等式，给出广义非线性系统无源且零解渐近稳定的充分条件。并在一定条件下得到存在状态反馈无源控制器，使得闭环系统无源且零解渐近稳定的充分条件，同时给出相应的控制器构造方法。     

一类关联时滞系统的分散稳定化控制器设计

应用Lyapunov稳定性理论,提出一类关联时滞系统能用分散线性状态反馈镇定的充分条件,进而证明了该条件等价于子系统级上N个带参数的代数Riccati矩阵方程的正定解的存在性,并利用这些正定解矩阵给出了相应的稳定化分散控制器。应用所提出的方法,可望得到具有更小反馈增益参数的分散稳定化控制律。     

时变不确定广义系统的鲁棒无源控制

研究了除E外其余系数矩阵均含有范数有界时变不确定性的广义系统的鲁棒无源控制器设计问题.利用线性矩阵不等式方法,首先给出自治系统广义二次稳定且无源的充分条件;然后给出状态反馈鲁棒无源控制器的存在条件并用线性矩阵不等式的解构造了相应的控制器;随后以矩阵不等式的形式得到了动态输出反馈鲁棒无源控制器的存在条件,同时利用矩阵不等式的解给出相应控制器的设计方法;最后举例说明了所提出方法的可行性.     

时滞T-S模糊系统的无源控制器设计

针对时滞T-S模糊系统, 给出了使得系统无源的状态反馈控制器存在的充分条件, 与现有结果相比保守性更小. 在此基础上, 给出了基于观测器的无源控制器与动态输出反馈无源控制器存在的充分条件. 控制器的设计方法都归结为求解一组线性矩阵不等式(Linear matrix inequality, LMI). 最后通过仿真例子, 说明所给设计方法的有效性.     

广义时滞系统输出反馈无源控制

研究一类广义时滞系统的输出反馈无源控制问题。利用线性矩阵不等式,给出广义时滞系统容许（即正则、稳定、无脉冲）且严格无源的充分条件,在此基础上给出静态输出反馈控制器,保证闭环系统容许且严格无源的充分条件,并且利用矩阵不等式的解设计相应的输出反馈控制器,提供一个算例说明结论的有效性。     

鲁棒渐近跟踪控制器设计的新方法

对于线性不确定系统,本文基于Riccati方程的正定解提出一种设计鲁棒渐近跟踪控制器的新方法.所设计的控制器,对于所有允许的系统参数变化,均使系统输出渐近跟踪某一参考输入.这种方法的特点是设计简单、实现方便.     

离散区间系统的H ∞ 鲁棒控制

研究离散区间系统的鲁棒稳定性分析和鲁棒控制问题,首先基于Ｒｉｃｃａｔｉ方程方法讨论系统的鲁棒稳定性,得到了检验该类系统鲁棒稳定的新的充分条件,然后给出了离散区间系统鲁棒控制器存在的充分条件,并通过求解修正的代数Ｒｉｃｃａｔｉ方程,给出了该控制器的设计方法。     

代数Riccati方程解的存在性条件

首先综述代数 Riccati 方程解的存在性条件, 然后对于该方程存在唯一正定最优解的充分必要条件给出严格证明. 最后利用这一条件, 纠正了鲁棒分散控制器设计中的一些错误结果.     

摄动离散矩阵Lyapunov方程解的估计

研究摄动离散矩阵Lyapunov方程解的估计问题,利用矩阵运算性质及Lyapunov稳定性理论,给出在结构不确定性假设下方程解的存在条件及解的上下界估计,估计结果由一个线性矩阵不等式(LMI)和两个矩阵代数Riccati方程确定．针对几种不确定性假设,进一步给出矩阵代数Riccati方程的具体形式．最后通过一个算例说明了所得结果的有效性．     

具有饱和输入的线性系统的无源控制

研究了一类具有饱和输入的线性系统的无源控制问题。利用Riccati方程的方法，Lyapunov稳定理论和矩阵理论，给出了一类具有饱和输入的线性系统可无源控制的一个新的充分条件、利用Riccati方程的解，提出了该系统的一种无源控制器的设计方法。该方法设计简单，利于工程的实现，仿真实例说明了其有效性。     

Finding the strongly rank-minimizing solution to the linear matrix inequality

Consideration is given to an nonstrict linear matrix inequality and associated Riccati equation that occurs on solving problems of analysis and synthesis of linear stationary discrete time systems. The strongly rank-minimizing solution to the considered linear matrix inequality also satisfies the associated Riccati equation. In this paper, a sufficient condition for finding this strongly rank-minimizing solution is represented.     

Robust stabilization of linear systems with norm-bounded time-varying uncertainty

In this paper, robust stabilization of a class of linear systems with norm-bounded time-varying uncertainties is considered. It is shown that for this class of uncertain systems quadratic stabilizability via linear control is equivalent to the existence of a positive definite symmetric matrix solution to a (parameter-dependent) Riccati equation. Also, a construction for the stabilizing feedback law is given in terms of the solution to the Riccati equation.     

Criterion for the convergence of the solution of the Riccati differential equation

The optimal control problem for a linear system with a quadratic cost function leads to the matrix Riccati differential equation. The convergence of the solution of this equation for increasing time interval is investigated as a function of the final state penalty matrix. A necessary and sufficient condition for convergence is derived for stabilizable systems, even if the output in the cost function is not detectable. An algorithm is developed to determine the limiting value of the solution, which is one of the symmetric positive semidefinite solutions of the algebraic Riccati equation. Examples for convergence and nonconvergence are given. A discussion is also included of the convergence properties of the solution of the Riccati differential equation to any real symmetric (not necessarily positive semidefinite) solution of the algebraic Riccati equation.     

Riccati differential equation in optimal filtering of periodic non-stabilizable systems

This paper discusses the periodic solutions of the matrix Riccati differential equation in the optimal filtering of periodic systems. Special emphasis is given to non-stabilizable systems and the question addressed is the existence and uniqueness of a steady-state periodic non-negative definite solution of the periodic Riccati differential equation which gives rise to an asymptotically stable steady-state filter. The results presented show that the stabilizability is not a necessary condition for the existence of such a periodic solution. The convergence of the general solution of the periodic Riccati differential equation to a periodic equilibrium solution is also investigated. The results are extensions of existing time-invariant systems results to the case of periodic systems     

一类不确定时滞系统的鲁棒几乎干扰解耦问题

讨论了一类不确定时滞系统的具有稳定性的鲁棒H_∞ 几乎干扰解耦问题 (RADDPS), 利用线性矩阵不等式和代数Riccati方程方法分别得到了RADDPS可解的充分条件, 并且相应给出鲁棒静态状态反馈控制器的设计.     

一类广义Riccati矩阵方程对称解的双迭代算法

研究了一类广义系统控制理论导出的Riccati矩阵方程对称解的数值计算方法．运用牛顿算法将Riccati矩阵方程的对称解问题转化为线性矩阵方程的对称解或者对称最小二乘解问题,采用修正共轭梯度法解决导出的线性矩阵方程的对称解问题,可建立求Riccati矩阵方程对称解的双迭代算法．数值算例表明,双迭代算法是有效的．     

On ℋ∞ control for dead-time systems

A mixed sensitivity ℋ_∞ problem is solved for dead-time systems. It is shown that for a given bound on the ℋ_∞-norm causal stabilizing controllers exist that achieve this bound if and only if a related finite-dimensional Riccati equation has a solution with a certain nonsingularity property. In the case of zero time delay, the Riccati equation is a standard Riccati equation and the nonsingularity condition is that the solution be nonnegative definite. For nonzero time delay, the nonsingularity condition is more involved but still allows us to obtain controllers. All suboptimal controllers are parameterized, and the central controller is shown to be a feedback interconnection of a finite-dimensional system and a finite memory system, both of which can be implemented. Some ℋ_∞ problems are rewritten as pure rational ℋ _∞, problems using a Smith predictor parameterization of the controller